论文信息 - Determinants and Symmetries in ‘Yetter—Drinfeld’ Categories

Determinants and Symmetries in ‘Yetter—Drinfeld’ Categories

A Yetter—Drinfeld category over a Hopf algebra H with a bijective antipode, is equipped with a ‘braiding’ which may be symmetric for some of its subcategories (e.g. when H is a triangular Hopf algebra). We prove that under an additional condition (which we term the u-condition) such symmetric subcategories completely resemble the category of vector spaces over a field k, with the ordinary ‘flip’ map. Consequently, when Char k=0, one can define well behaving exterior algebras and non-commutative determinant functions.

MIRIAM COHEN | SARA WESTREICH | S. Westreich | Miriam Cohen

[1] K. Ulbrich. Galoiserweiterungen von night-kommutativen ringen , 1982 .

[2] S. Westreich,et al. From Supersymmetry to Quantum Commutativity , 1994 .

[3] Jacob Towber,et al. Yetter-Drinfel'd categories associated to an arbitrary bialgebra , 1993 .

[4] David N. Yettera. Quantum groups and representations of monoidal categories , 1990, Mathematical Proceedings of the Cambridge Philosophical Society.

[5] S. Westreich,et al. Determinants, integrality and Noether’s theorem for quantum commutative algebras , 1996 .

[6] Shahn Majid,et al. Cross Products by Braided Groups and Bosonization , 1994 .

[7] D. Radford. Minimal Quasitriangular Hopf Algebras , 1993 .

[8] L. Lambe,et al. Algebraic Aspects of the Quantum Yang-Baxter Equation , 1993 .

[9] Stefaan Caenepeel,et al. Quantum Yang-Baxter module algebras , 1994 .